The classical Pell equation can be extended to the cubic case considering the elements of norm one in (Figure presented.), which satisfy (Figure presented.) The solution of the cubic Pell equation is harder than the classical case, indeed a method for solving it as Diophantine equation is still missing [3]. In this paper, we study the cubic Pell equation over finite fields, extending the results that hold for the classical one. In particular, we provide a novel method for counting the number of solutions in all possible cases depending on the value of r. Moreover, we are also able to provide a method for generating all the solutions.
On the cubic Pell equation over finite fields / Dutto, Simone; Murru, Nadir. - In: QUAESTIONES MATHEMATICAE. - ISSN 0379-9468. - 46:10(2023), pp. 2109-2128. [10.2989/16073606.2022.2144531]
On the cubic Pell equation over finite fields
Murru, Nadir
2023-01-01
Abstract
The classical Pell equation can be extended to the cubic case considering the elements of norm one in (Figure presented.), which satisfy (Figure presented.) The solution of the cubic Pell equation is harder than the classical case, indeed a method for solving it as Diophantine equation is still missing [3]. In this paper, we study the cubic Pell equation over finite fields, extending the results that hold for the classical one. In particular, we provide a novel method for counting the number of solutions in all possible cases depending on the value of r. Moreover, we are also able to provide a method for generating all the solutions.File | Dimensione | Formato | |
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